C–F⋯Rb+ interaction in a fluorinated cage compound complex

Tetrahedron Letters 47 (2006) 8989–8991

C–F


Rb+ interaction in a fluorinated cage compound complex Hiroyuki Takemura,a,* Tetsuo Iwanagab, and Teruo Shinmyozub, a

Department of Chemical and Biological Science, Faculty of Science, Japan Women’s University, Tokyo, Japan Institute for Materials Chemistry and Engineering, Kyushu University, Hakozaki 6-10-1, Fukuoka 812-8581, Japan

b

Received 29 August 2006; revised 5 September 2006; accepted 6 September 2006 Available online 30 October 2006

Abstract—A rubidium complex of a cage compound which is composed of fluorobenzene, ethylenedioxy, and bridgehead nitrogen donor units was prepared. The C–F


Rb+ interaction was clarified and evaluated for the first time by crystallographic analysis. The contribution degree of the three kinds of donor atoms for the cation binding was estimated by Brown’s bond valence equation.  2006 Elsevier Ltd. All rights reserved.

In the previous reports, we described cation affinity of the fluorobenzene unit. The essential driving force of the interaction is cation–dipole interaction and all alkali metal cations are encapsulated by the fluorinated cage compounds. The structural information is very important for such study, and thus, those of K+, Cs+, Tl+, and La3+ complexes of 1 were clarified and estimated by Brown’s bond valence theory.1 However, in the series of this study, the Rb+ ion was not specially noted. This tendency is the same as in the case of crown ethers and cryptands. In a simple search using SciFinderTM by the ‘M & crown ether; M = lithium, sodium, potassium, rubidium, and cesium’ as keywords, we found 108 examples for lithium, 215 for sodium, 292 for potassium, 43 for rubidium, and 82 for cesium on August 7, 2006. A review of CF


M+ also described that the reports of CF


Rb+ short contact are very rare, and only four examples were shown in it.2 The two of the four reports did not refer to the CF


Rb+ short contacts and short comments were given in the other two reports (2b and 2c). Hence, a study of CF


Rb+ in our ligand system stimulates us and becomes important because it offers detailed data about CF


Rb+ interaction (Fig. 1). Therefore, this is the first report evaluating the CF


Rb+ interaction by the structural analysis. The methodologies of this study have been already established by previous researches,1 that is, 19 F-, 13C NMR, X-ray crystallographic analysis, and its estimation using Brown’s bond valence theory. Keywords: C–F; Cryptand; Bond valence; Macrocycles. * Corresponding author. Tel./fax: +81 3 5981 3664; [email protected]  Tel.: +81 92 642 2716; fax: +81 92 642 2735.

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N F N

O

F Rb+

N

O F

F N

1 Figure 1. Structure of Rb+  1.

As reported previously, the 19F NMR signal appeared at 120.9 ppm and this is 4.2 ppm higher than that of metal-free 1 ( 116.7 ppm), which is also common to other metal complexes.1,2 In the 13C NMR, the 19 F–13C coupling constant (244.0 Hz) is reduced to about 12.6 Hz and it is comparable to other alkali metal complexes. These two spectroscopic features are representative evidences of the C–F


M+ interaction as reported previously.1,2 The linear relationships between dF versus ionic radii and JC–F versus log Ks (stability constants of M+  1) have already been shown in a previous report.1e In the 19F NMR, almost all of the metal complexes (Li+, Na+, K+, and La3+) showed a sharp singlet. In some cases, the metal complexes of 1 and its analog showed 19 F


M+ couplings (M = Cs and Tl). We were thus interested in whether the Rb+  1 shows 19F


85,87Rb (I = 5/2 for 85Rb, and I = 3/2 for 87Rb) coupling. However, in this case, the coupling was not observed in 19 F NMR at room temperature or at low temperatures

8990

H. Takemura et al. / Tetrahedron Letters 47 (2006) 8989–8991 Table 1. Results of crystallographic analysis of Rb+  1ÆPic ˚ ) Interatomic Bond lengths (A Bond angles () ˚) distances (A C7–F1 1.375(4) F1


Rb C17–F2 1.370(3) F2


Rb

2.803(2) C7–F1


Rb 106.02(2) 2.804(2) C14–F2


Rb 106.67(2)

O1


Rb 2.976(3) O1–Rb


O2 O2


Rb 3.061(3)

180.0

N1


Rb 3.300(3) F1–Rb


F1* N2


Rb 3.329(2) F2–Rb


F2*

131.61(8) 132.45(7)

˚. rC–F(average) of metal-free is 1.356 A

showed that C–F bond lengths, C7-F1 = 1.375(4) and ˚ , are longer than those of metalC17–F2 = 1.370(3) A ˚ free 1 (1.356 A, in average).3 The F


Rb+ distance is ˚ , and much shorter than the sum of van der 2.803 A ˚ ) of the F atom and ionic radius Waals radius (1.47 A ˚ ). Thus, it is clear that CF and Rb+ interof Rb+ (1.66 A action is an attractive one. Figure 2. Structure of Rb+  1ÆPic resulted from crystallographic analysis (picrate anion is omitted for clarity).

( 90 C), and a sharp 19F signal was maintained even at 90 C. At low temperatures, conformation of the cage structure of 1 is frozen and positions of the F atoms are fixed. Since spectral features are common to other metal complexes, structural data were estimated based on the crystallographic analysis (Fig. 2). As shown in Table 1, the results of the crystallographic analysis of Rb+  1ÆPic

As described above, four articles reported CF–Rb+ short contacts, but these values are inconsistent (2.80– ˚ )2 and could not be considered to correlate to 3.538 A our case. As shown in Figure 3, the relationship between the structure of the complexes and the ionic radii of the cations were revealed. The CF


M+ (M = K, Rb, and Cs) angles and cation sizes have a good linear relationship (Fig. 3a). As the cation size becomes smaller, CF


M+ angles become larger. Thus, K+ ion fits to the ligand cavity size, but larger ion, Rb+ and Cs+ changes the

˚ ) and (a) C–F


M+ angles (), (b) X (X = F, O, and N)


M+ distances (A ˚ ), and (c) C–F Figure 3. Relationship between ionic radii of the cations (A + lengths of the complexes and their F


M distances.

H. Takemura et al. / Tetrahedron Letters 47 (2006) 8989–8991 Table 2. Brown’s bond valence, s, of the complexes s P + Ps(F


M +) s(O


M ) P s(N


M+) PP V= sX

K+  1

Rb+  1

Cs+  1

0.620 0.178 0.212 1.01

0.636 0.261 0.347 1.244

0.689 0.329 0.395 1.413

position of C–F unit. This result coincided with the affinity of the cations.1e Although O, N


M+ distances are almost constant, F


M+ distances increased in proportion to cation ionic radii (Fig. 3b). Contrary to this, C–F lengths become longer as F


M+ distances become short (Fig. 3c). Therefore, it is considered that F


M+ attractive force effectively lengthens the C–F bond. By using Brown’s bond valence equation,4 we can estimate the bonding contribution of each donor atom to the Rb+ cation and compare the bond valences among the three complexes. Table 2 summarizes the results. The P bonding contribution of each one donor atom ( s(X


Rb+)/n, X = F, O, and N) increased in the or(0.131) < F


Rb+ der of N


Rb+ (0.087)  O


Rb+PP (0.159). Total bond valence, V = sX, of K+  1, + + Rb  1, and Cs  1 and the ionic radii of the cations are in a good linear relationship (R = 0.992). The V values of Rb+  1 and Cs+  1 are larger than 1.0 and this was explained by the relationship between the rigidity of the ligand structure and metal ion size.1e,5 In conclusion, a very rare C–F


Rb+ interaction was observed and its structural features were revealed by crystallographic analysis. By comparing the previously reported K+ and Cs+ complex structures, the relationship among cation sizes and ligand structures (C–F bond lengths, C–F


M+ angles and X


M+ distances) was clarified. The C–F bond elongation and short contact between the F and Rb+ atoms are representative evidence of the interaction, and the bond valence equation showed superiority of the C–F donor nature over O and N atoms.

References and notes 1. (a) Takemura, H.; Kon, N.; Yasutake, M.; Kariyazono, H.; Shinmyozu, T.; Inazu, T. Angew. Chem. 1999, 111, 1012–

2.

3.

4. 5.

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1014; Angew. Chem., Int. Ed. 1999, 38, 959–961; (b) Takemura, H.; Kariyazono, H.; Yasutake, M.; Kon, N.; Tani, K.; Sako, K.; Shinmyozu, T.; Inazu, T. Eur. J. Org. Chem. 2000, 141–148; (c) Takemura, H.; Kon, N.; Yasutake, M.; Nakashima, S.; Shinmyozu, T.; Inazu, T. Chem. Eur. J. 2000, 6, 2334–2337; (d) Takemura, H.; Nakashima, S.; Kon, N.; Inazu, T. Tetrahedron Lett. 2000, 41, 6105– 6109; (e) Takemura, H.; Kon, N.; Kotoku, M.; Nakashima, S.; Otsuka, K.; Yasutake, M.; Shinmyozu, T.; Inazu, T. J. Org. Chem. 2001, 66, 2778–2783; (f) Takemura, H.; Nakashima, S.; Kon, N.; Yasutake, M.; Shinmyozu, T.; Inazu, T. J. Am. Chem. Soc. 2001, 123, 9293–9298; (g) Takemura, H. Synth. Org. Chem. Jpn. 2002, 60, 963–973; (h) Takemura, H. In Cyclophane Chemistry for the 21st Century; Takemura, H., Ed.; Transworld Research Network: India, 2003; pp 127–148. (a) Plenio, H. Chem. Rev. 1997, 97, 3363–3384; (b) Carrell, H. L.; Glusker, J. P. Acta Crystallogr., Sect. B 1973, 29, 674–682; (c) Fenton, D. E.; Nave, C.; Truter, M. R. J. Chem. Soc., Dalton Trans. 1973, 2188–2194; (d) Macintyre, W. M.; Zirakzadeh, M. Acta Crystallogr. 1964, 17, 1305– 1311; (e) Davoy, K. T.; Gramstad, T.; Husebye, S. Acta Chem. Scand. Ser. A 1979, 33, 359–363. Crystallographic data of compound Rb+  1ÆPic : C46H46F4N7O9Rb, Mr = 1002.4 g mol 1, yellow granules (grown from CH2Cl2–CH3CN), size 0.54 · 0.44 · 0.42 mm, mono˚, b= clinic, space group C2/c (#15), a = 20.9389(4) A ˚ , c = 12.7228(3) A ˚ , a = 90, b = 124.3618(4) 19.9019(3) A ˚ 3, Z = 4, qcalcd. = 1.521 g cm 3, c = 90, V = 4376.7(2) A 1 l(MoKa) = 12.15 cm , F(0 0 0) = 2064, T = 113(2) K using the x–2h scan technique to a maximum 2h value of 55. A total of 4995 reflections were collected. The final cycle of the full-matrix least-squares refinement was based on 3980 observed reflections (I > 2r(I)) and 145 variable parameters and converged with unweighted and weighted agreement factors of R = 0.0579, Rw = 0.1744, and GOF = 1.352. The maximum and minimum peaks on the final difference Fourier map corresponded to 0.847 and ˚ 3, respectively. Crystallographic data (exclud1.037 e /A ing structure factor) for the structure reported in this paper have been deposited with the Cambridge Crystallographic Data Centre as Supplementary Publication No. CCDC 617154. Copies of the data can be obtained free of charge on application to CCDC, 12 Union Road, Cambridge CB21EZ, UK (fax: +44 1223 33603; e-mail: deposit@ccdc. cam.ac.uk). (a) Brown, I. D.; Altermatt, D. Acta Crystallogr., Sect. B 1985, 41, 244–247; (b) Altermatt, D.; Brown, I. D. Acta Crystallogr., Sect. B 1985, 41, 240–244. (a) Takemura, H.; Shinmyozu, T.; Inazu, T. J. Am. Chem. Soc. 1991, 113, 1323–1331; (b) Takemura, H.; Kon, N.; Tani, K.; Takehara, K.; Kimoto, J.; Shinmyozu, T.; Inazu, T. J. Chem. Soc., Perkin Trans. 1 1997, 239–246.